Factors, Multiples and Primes Place Value and Orderingresources.collins.co.uk/Wesbite...
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Factors, Multiples and Primes4 Module 2
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Maths symbols:
4 Place Value and Ordering Module 1
An integer is a whole number; it can be positive, negative or zero.
Positive A number above zero.
Negative A number below zero.KEY
WO
RD
S
1
This table summarises the rules:
+ × or ÷ + = +
+ × or ÷ – = –
– × or ÷ + = –
– × or ÷ – = +
A positive number multiplied by a negative number gives a negative answer.
A negative number multiplied by a negative number gives a positive answer.
Multiplying and dividing integers Look at these examples.
Multiplying a negative number by a positive number
always gives a negative answer.
–5 × +3 = –15+5 × –3 = –15
The same rules work for division.
+10 ÷ –5 = –2–10 ÷ –5 = +2
Multiplying two positive numbers or multiplying two
negative numbers always gives a positive answer.
+4 × +3 = +12–4 × –3 = +12
Adding and subtracting integers Adding a negative number or subtracting a
positive number will have the same result.
3 + –5 = –23 – +5 = –2
+ + means +
+ – means –
– + means –
– – means +
Adding a positive number or subtracting a
negative number will have the same result.
–1 + +4 = +3–1 – –4 = +3
3210–1–2
3210
–1–2
Go down
by 5.
Go up
by 4.
Adding a negative number means subtract.
Subtracting a negative number means add.
Use a number line to visualise the answer.
Pla
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Factors, Multiples and Primes 5Module 2Place Value and Ordering 5Module 1
1. Calculate the following:
(a) –5 – –8
(b) –2 + –6
(c) –7 + –3 – –5
2. Calculate the following:
(a) –12 × –4
(b) 24 ÷ –3
(c) –3 × –4 × –5
3. State whether these statements are true or false.
(a) 6 < 3
(b) –4 > –5
(c) 2 + –3 = 2 – +3
4. Given that 43 × 57 = 2451, calculate the following:
(a) 4.3 × 0.57
(b) 430 × 570
(c) 2451 ÷ 5.7
Use of symbols Look at the following symbols and their meanings.
Symbol Meaning Examples
> Greater than 5 > 3 (5 is greater than 3)
< Less than –4 < –1 (–4 is less than –1)
> Greater than or equal to x > 2 (x can be 2 or higher)
< Less than or equal to x < –3 (x can be –3 or lower)
= Equal to 2 + +3 = 2 – –3
≠ Not equal to 42 ≠ 4 × 2 (16 is not equal to 8)
Place value Look at this example.
Given that 23 × 47 = 1081, work out 2.3 × 4.7
The answer to 2.3 × 4.7 must have the digits 1 0 8 1
2.3 is about 2 and 4.7 is about 5. Since 2 × 5 = 10, the answer must be about 10.
Therefore 2.3 × 4.7 = 10.81
Write the following symbols and numbers
on separate pieces of paper.
+ – × ÷ = 0
+2 –2 +4 –4 +8 –8
Arrange them to form a correct calculation.
How many different calculations can you
make? For example:
+2 – –2 = +4
Do a quick estimate to find where the decimal point goes.
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8)
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18
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1. Work out the following.
(a) 4 × 5.8 [2] (b) 2.3 × 42.7 [3]
(c) 24 ÷ 0.08 [2] (d) 46.8 ÷ 3.6 [2]
(e) –3 + –4 [1] (f) –2 – –5 + –6 [1]
(g) 45 ÷ –9 [1] (h) –4 × –5 × –7 [1]
(i) 4 + 32 × 7 [1] (j) (5 – 62) – (4 + 25 ) [2]
2. (a) Write 36 as a product of its prime factors. Write your answer in index form. [2]
(b) Write 48 as a product of its prime factors. Write your answer in index form. [2]
(c) Find the highest common factor of 48 and 36. [2]
(d) Find the lowest common multiple of 48 and 36. [2]
3. (a) Work out the following.
4
3 × 5
6
Write your answer as a mixed number in its simplest form. [2]
(b) The sum of three mixed numbers is 711
12. Two of the numbers are 23
4 and 35
6.
Find the third number and give your answer in its simplest form. [3]
(c) Calculate 31
5 ÷ 21
4.
Give your answer as a mixed number in its simplest form. [3]
4. Simplify the following.
(a) 53 ÷ 5–5 [1] (b) 98 [1] (c) −7(4 3 7) [2]
5. Evaluate the following.
(a) 2.30 [1] (b) −
91
2 [2] (c) 274
3 [2]
6. (a) Write the following numbers in standard form.
(i) 43 600 [1] (ii) 0.008 03 [1]
(b) Calculate the following, giving your answer in standard form.
(1.2 × 108) ÷ (3 × 104) [2]
7. Prove the following. You must show your full working out.
(a) 0.48• •
= 16
33 [2] (b) 0.1
• •23 =
61
495 [2]
8. Rationalise the following surds.
(a) 7
5 [2] (b) +
3
1 2 [2]
9. Paul’s garage measures 6m in length to the nearest metre. His new car measures
5.5m in length to 1 decimal place.
Is Paul’s garage definitely long enough for his new car to fit in?
Show your working. [3]
10. a = 4.3 and b = 2.6 to 1 decimal place.
Find the minimum value of ab and give your answer to 3 decimal places. [3]
NumberExam Practice Questions
Exam
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Proportion28 Module 22
1 If Shabir has 250ml of soup for her
lunch, how many kilocalories
of energy will she get? [2 marks]
2 Leon changes £500 to euros
at the rate shown and goes to
France on holiday.
(a) How many euros does he take on holiday? [1 mark]
Leon spends €570.
(b) He changes his remaining euros on the ferry where the exchange rate is £1 : €1.33
How much in pounds sterling does he take home? [2 marks]
3 James’ dairy herd of 80 cattle produces 1360 litres of milk per day.
(a) If James buys another 25 cattle and is paid
30p/litre, what will his annual milk income be? [4 marks]
(b) If 6 tonnes of hay will last 80 cattle for 10 days, how long will the same amount
of hay last the increased herd? [2 marks]
4 Triangles PQR and STU are similar.
Find the missing lengths PR and TU. [4 marks]
PR =
TU =
5 Two similar cylinders P and Q have surface areas of 120cm2 and 270cm2.
If the volume of Q is 2700cm3, what is the volume of P? [3 marks]
cm3
Mod
ule
22Pr
opor
tion
For more help on this topic, see Letts GCSE Maths Higher Revision Guide pages 50–51.
100ml = 59kcal
Surface
area:
120cm2
P
Q
Surface
area:
270cm2
Volume:
2700cm3
Score /18
6cm
9cm
6cm
Q
4.5cm
T
USRP
Not accurately
drawn
£1 = 1.29 euros
£1 = 1.56 US dollars
£1 = 187.99 Japanese yen
£1 = 97.04 Indian rupees
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Rates of Change 29Module 23
For more help on this topic, see Letts GCSE Maths Higher Revision Guide pages 52–53.
1 (a) Peter invests £10 000 in a savings account which pays 2% compound interest
per annum.
How much will his investment be worth after four years? [2 marks]
(b) Paul invests £10 000 in company shares.
In the fi rst year the shares increase in value by 15%.
In the second year they increase by 6%.
In the third year they lose 18% of their value.
In the fourth year the shares increase by 1%.
What is his investment worth after four years? [3 marks]
2 Lazya invests £6500 at 3% compound interest for three years. She works out the
fi rst year’s interest to be £195. She tells her family she will earn £585 over three years.
Is she right? Show working to justify your decision. [3 marks]
3 This graph shows a tank being fi lled with water.
(a) How deep is the water when the tank is full?
[1 mark]
(b) Between what times is the tank fi lling fastest?
[1 mark]
(c) Work out the rate of decrease of water
level as the tank empties. [1 mark]
4 This graph shows the distance travelled by a
cyclist for the fi rst 10 seconds of a race.
(a) Work out the cyclist’s average speed
for the fi rst 10 seconds.
[2 marks]
(b) Estimate the actual speed at 5 seconds.
[3 marks]
Mod
ule
23Ra
tes
of C
hang
e
0 2 4 6 8 10 12 14 16
20
10
0
Dep
th (
cm)
Time (min)
0 1 2 3 4 5 6 7 8 9 10
Dis
tan
ce (
met
res)
220
200
180
160
140
120
100
80
60
40
20
0
Time (seconds)
Score /16
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56 Practice Exam
14. Here is a square and an isosceles triangle.
x
x
The length of each of the equal sides of the triangle is 3cm greater than the side of the square.
(a) If the perimeters of the two shapes are equal, fi nd the value of x. [3]
(b) Show that the height of the triangle is equal to the diagonal of the square. [3]
15. The graph of =y xcos is shown for 0 360° °x¯ ¯
y
x
–1
–2
90° 180° 270° 360°
1
2
0
On the same grid, sketch and label the graphs of
(a) y = −cos x [2]
(b) y = cos x + 1 [2]
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57Practice Exam
16. Calculate the circumference of this circle.
3cm
Leave your answer in terms of π. [2]
cm
17. Calculate angle BCD, giving your reasons. [3]
CA
B D
50°75°
80°
18. Work out the next term of this quadratic sequence:
–2 3 14 31 [2]
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